AN EXTENSION OF THE VARIATIONAL INEQUALITY APPROACH FOR OBTAINING CONVERGENCE RATES IN REGULARIZATION OF NONLINEAR ILL-POSED PROBLEMS

RADU IOAN BOT; BERND HOFMANN

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AN EXTENSION OF THE VARIATIONAL INEQUALITY APPROACH FOR OBTAINING CONVERGENCE RATES IN REGULARIZATION OF NONLINEAR ILL-POSED PROBLEMS

机译：非线性不适定问题正则化中收敛速度的变分不等式的扩展

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Convergence rates results for Tikhonov regularization of nonlinear ill-posed operator equations in abstract function spaces require the handling of both smoothness conditions imposed on the solution and structural conditions expressing the character of nonlinearity. Recently, the distinguished role of variational inequalities holding on some level sets was outlined for obtaining convergence rates results. When lower rates are expected such inequalities combine the smoothness properties of solutions and forward operators in a sophisticated manner. In this paper, using a Banach space setting we are going to extend the variational inequality approach from Holder rates to more general rates including the case of logarithmic convergence rates.

机译：非线性不适定算子方程在抽象函数空间中的Tikhonov正则化的收敛速度结果要求处理施加在解上的平滑条件和表达非线性特征的结构条件。最近，概述了在一些水平集上保持变分不等的杰出作用，以求得收敛速度结果。当期望更低的速率时，这种不等式会以复杂的方式将解决方案和正向运算符的平滑性结合起来。在本文中，使用Banach空间设置，我们将把变分不等式方法从Holder率扩展到更一般的率，包括对数收敛率的情况。

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《The Journal of integral equations and applications》 |2010年第3期|共24页
作者
RADU IOAN BOT; BERND HOFMANN;
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正文语种 eng
中图分类数学;
关键词
REGULARIZATION; ILL-POSED PROBLEMS; CONVERGENCE;

机译：规制;不适定问题;收敛;
入库时间 2022-08-18 18:19:41

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1. AN EXTENSION OF THE VARIATIONAL INEQUALITY APPROACH FOR OBTAINING CONVERGENCE RATES IN REGULARIZATION OF NONLINEAR ILL-POSED PROBLEMS [J] . RADU IOAN BOT, BERND HOFMANN The Journal of integral equations and applications . 2010,第3期

机译：非线性不适定问题正则化中收敛速度的变分不等式的扩展
2. Numerical results of convergence rates in regularization for ill-posed mixed variational inequalities [J] . R. Brooks Applied mathematical sciences . 2008,第21a24期

机译：不适定混合变分不等式正则化收敛速度的数值结果
3. A Regularized Variational Inequality Approach for Nonlinear Monotone Ill-Posed Equations [J] . Plato Robert, Hofmann Bernd Journal of Optimization Theory and Applications . 2019,第2期

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4. Logarithmic convergence rates of tikhonov regularization for nonlinear ill-posed problems [C] . Xiao-Mei Yang, Zhi-Liang Deng 2012 International Conference on Wavelet Active Media Technology and Information Processing. . 2012

机译：非线性不适定问题的tikhonov正则化的对数收敛速度
5. Total variation regularization for linear ill-posed inverse problems: Extensions and applications. [D] . Stefan, Wolfgang. 2008

机译：线性不适定反问题的总变化正则化：扩展和应用。
6. Convergence analysis of an iterative algorithm for the extended regularized nonconvex variational inequalities [O] . Ying Zhao, Luoyi Shi, Rudong Chen -1

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7. An extension of the variational inequality approach for obtaining convergence rates in regularization of nonlinear ill-posed problems [O] . Radu Ioan Boţ, Bernd Hofmann 2010

机译：在非线性呈现问题正规化中获得收敛率的变分不等式方法的延伸
8. Well-Posedness and Convergence of Some Regularization Methods for Nonlinear Ill-Posed Problems. [R] . Seidman, T. I., Vogel, C. R. 1987

机译：非线性不适定问题一些正则化方法的适定性与收敛性。

AN EXTENSION OF THE VARIATIONAL INEQUALITY APPROACH FOR OBTAINING CONVERGENCE RATES IN REGULARIZATION OF NONLINEAR ILL-POSED PROBLEMS

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